Robotic vehicles such as straddle carriers represent a popular form of cargo handling amongst container terminal operators.
The purpose of this industry-driven study is to model preventative maintenance (PM) influences on the operational effectiveness of straddle carriers.
The study employs historical data consisting of 21 273 work orders covering a 27-month period. Two models are developed, both of which forecast influences of PM regimes for different types of carrier.
The findings of the study suggest that the reliability of the straddle fleet decreases with increased intervals of PM services. The study also finds that three factors – namely resources, number of new straddles, and the number of new lifting work centres – influence the performances of straddles.
The authors argue that this collaborative research exercise makes a significant contribution to existing supply chain management literature, particularly in the area of operations efficiency. The study also serves as an avenue to enhance relevant management practice.
Global sea cargo operations are expanding rapidly and testing global cargo infrastructures to their limits (Choi
Straddle carrier workplaces.
According to Huang and Chu (
Striving for greater efficiency might simply mean minimising financial and time costs, perhaps also adjusting for risk. Looking at the issue from a broader perspective, greater efficiency may encompass the pursuit of ‘agility’, such that cheaper and quicker shifts in usage become possible for a broader range of task parameters. It might also encompass the pursuit of ‘resilience’, such that poor weather conditions or skill shortages become less likely to hamper intensive or varied use of infrastructure. Building resilience might also entail minimising downtime required for equipment maintenance, repair or replacement.
When ships dock at cargo terminals, quay cranes are used to move containers from ship to quayside. Straddles then move the containers to stack areas where they can be picked up by trains or trucks for further onward movement (Roso, Wosenius & Lumsden
Maintenance is conceptualised by scholars such as Sarker and Haque (
This study therefore examines the impact of PM services on the maintenance system of straddle carriers. To support the study objective the rest of the article is organised as follows. In section two we provide background information on the operations of the case organisation and also address the generation of regression models which enable us to explore the relationships between the mean time between failures (MTBF) and mean time between maintenance (MTBM). This is followed by section three, where we develop simulation models for working processes for the repair and lifting systems, the objective being to forecast straddle-fleet reliability against different PM service intervals. Section four focuses on the assessment of different straddle performance scenarios, and in the penultimate section we discuss the findings of the study, followed by the conclusion in section six.
With a fleet of 88 straddles grouped into 12 batches, the complexity and scale of the operations of the case organisation (herein referred to as organisation ‘A’) are vast. Founded in the 1980s, organisation A is one of the largest container terminal operators in the United Kingdom. Since 2008 the company has had to adapt to increases in container numbers of between 5% and 10% each year. Workloads are usually concentrated heavily around September and October, when goods ordered for the coming December holiday shopping period are processed through the port.
The company's operational managers are expected to ensure that available straddles are picked for container handling every 12 hours. For ease of operations the available 88 straddles are classified into 12 batches, based on age, manufacturer and type. The company currently owns 33 straddles manufactured by Kalmar Ltd and 55 manufactured by Noell Mobile Systems. Straddles designated ‘3H’ refers to those which are able to lift containers up to three times the height of a container, whilst ‘4H’-designated straddles are able to lift containers up to four times the height of a container. The company has 543H-designated straddles and 344H-designated straddles.
Referring to
Registry of straddles.
A total of eight technicians working two shifts from Monday to Thursday are assigned to the preventive maintenance repair team. Both mechanical and electrical maintenance is based on two shift periods that cover a day shift from 7 am to 7 pm and a night shift from 7 pm to 7 am Mechanical maintenance focuses on oil and filter changes, and tyres. Electrical maintenance focuses on components such as circuits and reverse alarms. Part of the maintenance challenge faced by organisation A is to minimise downtime through the well-known approach of optimising PM (see Moghaddam & Ushe
There are three constituent elements of the straddle maintenance system being employed by the case organisation: (1) PM services, (2) remedial (REM) services and (3) breakdown (BD) services. PM generally focuses on preserving and restoring the reliability of straddles by proactively replacing components which may be worn before they actually break down or fail unexpectedly. The company generally carries out two main types of PM services, one focused on mechanical services and the other on electrical services.
REM services involve corrective maintenance, whilst BD services represent emergency maintenance. Generally BD services do have an impact on the reliability of the straddle fleet. Currently there are five bays for PM services and four bays for REM services. In the repair system there are no real queues for PM service and REM services as, during waiting time, straddles remain operational. BD services are divided into two types: those that are serious and those that are not deemed as such by operators and managers. For non-serious breakdowns, such as no lights, repair work is undertaken outside the bays. Only serious BD services are carried out in designated work centres.
In
Workflow of maintenance.
The study employs real-life data obtained via participant observation and action research as described by Argyris and Schon (
Our first step was to separate the original data into small categories. We then selected the most relevant categories, as displayed in
Related categories for analysis.
Repair services | Related services |
PM services | Work order number |
Sub-services: Only consider mechanical and electrical services | |
Status: Overdue and finished | |
Actual start time | |
Actual finish time | |
BD services | Work order number |
Sub-services: All types of sub-services | |
Status: Finished | |
Reported time | |
Actual finish time |
PM, preventative maintenance; BD, breakdown.
There were three stages to the data handling; the first involved separating the original data into small categories by classifying data into groups depending on different services and batches. The second stage involved data categorisation, with the main indices of this stage being the average durations for BD and PM services. The final stage involved identifying correlations between the MTBF and the MTBM, and generating the regression equations for the straddle fleet.
As changes in the status of a straddle generate work orders, these orders were utilised to search corresponding run time. In terms of the status of BD services, we focused on finished services. Maximum run time for each straddle before PM is 1800 hours; however, some operators are known to overrun this parameter. We therefore analysed PM services with status options of ‘overdue’ and ‘finished’. Thus we represent service durations as time periods between (
Where:
It is then expected that, as PMs increase, BDs will decrease.
In
Breakdown against preventative maintenance service intervals.
Regression of breakdown and preventative maintenance service intervals.
Analysis of variance of breakdown and preventative maintenance service intervals.
Source | SS | MS | |||
Regression | 3 | 4825 | 1608.33 | 0.8 | 0.499 |
Error | 66 | 132 969 | 2014.69 | - | - |
- | - | - |
H0: μ(no of BD service) = μ(PM service interval)
H1: μ(no of BD service) ≠ μ(PM service interval)
F0.05 (3,80) = 2.744 > 0.8
so we accept
From regression models for the 3H and 4H straddles, the
In terms of the relationship between the MTBF and the MTBM of straddles built by different manufacturers (in this case, Noell and Kalmar), the prediction of the MTBF for Noell straddles was 23.6% higher than for Kalmar straddles. For Noell-built straddles, when the MTBM is less than 1200 hours or greater than 2100 hours, the MTBF was observed to decrease as the MTBM increased.
In terms of regression models for straddles purchased before and after 2005, we find that
Analysis of variance for the mean time between failures and the mean time between maintenance.
Source | SS | MS | |||
Regression | 3 | 1187.9 | 395.965 | 1.79 | 0.156 |
Error | 80 | 17711.5 | 221.394 | - | - |
- | - | - |
The hypothesis is:
H0: μMTBF = μMTBM
H1: μMTBF ≠ μMTBM
F0.05 (3,80) = 2.719 > 1.79
so we accept H0, which means the population means of MTBF and MTBM are the same.
In summary, in terms of expected outcomes of the analysis, we found that: (1) MTBF decreases with straddle age, (2) at the same age, the MTBF of the 3H straddles is higher than the 4H straddles, (3) for old straddles (over 2 years old) decreasing values for MTBM directly correlate to increases in age, (4) MTBFs for 3H straddles are more predictable than for 4H straddles, (5) MTBFs for straddles purchased after 2005 are more predictable than for those purchased before 2005, (6) the MTBFs of straddles purchased from the Noell Company are more predictable than for those purchased from Kalmar and (7) for new straddles, MTBM does not impact upon MTBF.
On the other hand, in terms of unexpected outcomes, we found that: (1) a positive correlation (0.212) emerged between MTBF and MTBM, (2) a negative correlation emerged between the number of BD services and PM services intervals, (3) for 3H straddles, unexpected results were observed with MTBM less than 1200 hours or greater than 2000 hours, (4) for 4H straddles, unexpected results were observed with MTBM less than 1400 hours, (5) for straddles purchased before 2005, unexpected results were observed with MTBM less than 1200 hours or greater than 2000 hours and (6) for Noell's straddles, unexpected results were observed for MTBM less than 1200 hours or greater than 2100 hours.
Here we employ queuing theory to develop simulation models and forecast fleet reliability against different PM services intervals. Historical data on old straddles covered the period between August 2008 and July 2010, whilst for new straddles historical data covered the period between May 2009 and July 2010. From queuing theory we know the inter-arrival time is the time between (
Time stamp for each index.
Index | Time stamp |
TOC | From enter WCs† to exit WCs |
TPM | From enter WCs to exit WCs |
TCM | From enter WCs to exit WCs |
TEM | From enter queue for BD WCs to exit WCs |
TOC, total hours of lifting work; TPM, total hours of preventative maintenance services; TCM, total hours of remedial services; TEM, total hours of breakdown services, WC, work centre.
†, denotes work centre in the simulation model.
In
Values and distributions for main indices in simulation models.
Indices | Distribution | Values |
Inter-arrive time for containers | Fixed | 0.005 |
Service time for lifting | Normal | Mean: 0.118184 |
SD: 0.034267 | ||
Inter-arrivetime for REM services | Normal | Mean: 6.3292 |
SD: 3.7489 | ||
Service time for REM | Normal | Mean: 54.445 |
SD: 30.7071 | ||
Inter-arrive time for BD services | Normal | Mean: 0.8762 |
SD: 0.4031 | ||
Service time for BD | Normal | Mean: 1.7222 |
SD: 1.7166 | ||
Service time for PM | Normal | Mean: 40.9036 |
SD: 19.6748 |
REM, remedial; BD, breakdown; PM, preventative maintenance; SD, standard deviation.
We make the following modelling assumptions. In the first place, we assume that the working efficiency for each straddle and labour resource is 100%. We also assume that the waiting time for PM services is not included in the TPM. It is also assumed that the waiting time for REM services is not included in the TCM; nor is the waiting time for lifting included in the TOC. We also assume that inspections in the repair system are perfect. This implies that only straddles requiring repair are housed in the work centres at any one time. Finally, we assume that straddles in the repair system cannot undergo multiple services simultaneously. The model is also limited by the following considerations: (1) the total number of straddles in the system is 84, (2) PM intervals for old straddles range from 1000 hours to 3000 hours, (3) the average queuing time for each BD work centre cannot exceed 0.1 hours whilst utilisations for each repair team must be less than 100% and (4) the maximum number of straddles employed in the lifting system is 66.
We developed two modelling solutions for estimating the inter-arrival time of PM services. One focused on individual performances of straddles whilst the other concentrated on groups of straddles, divided into old and new groups. For the first solution, actual working hours of each straddle is tracked and managed by Visual Logic codes only. PM services also have a lower priority level than the lifting work. The straddle is sent to the PM work centres, when the working hour for the straddle equals the PM interval and the straddle is in the waiting-for-work list. For the second solution, PM services have a higher priority level than lifting work. During the data collection period, the total number of containers lifted is 2 228 179 with 75% (1 645 789 containers) from the old group and 26% (582 390 containers) from the new group. We used Simul8 to auto-adjust the replicated straddle levels. We also (1) set the maximum number of new and old lifting work centres to 10 and 56 respectively and (2) set up 84 resources to represent the 84 straddles, of which 70 were old and 14 were new. Cumulative working hours for each straddle were then calculated and recorded in a spreadsheet. For every user-defined hour (1800 hours), a straddle is sent to the PM service storage bin. In terms of the second solution, during the 24 months between June 2008 and June 2010 there were 538 recorded cases of PM services, 483 of which emanated from the old group and 55 from the new group. The service period for the old group was 24 months (average PM interval of 1804 hours; inter-arrival time 35.78 hours), but for the new group, purchased in June 2009, it was 13 months (average PM interval of 1064 hours; inter-arrival time 157.01 hours).
For our basic PM model, when sufficient technicians are not available other time slots are booked for maintenance. However, to minimise straddle occupancies within repair centres, high priority is usually given to BD services. There are two expected results from the two simulation models. In the first place, with increased intervals reliability will obviously decrease. The second expected result is a negative correlation between TPM and TEM. We found that the reliability change against increasing PM service intervals for the first model was 94.3%, whilst the figure recorded for the second model was 93.75%. Hence, as the first model outperformed the second model, we utilise data from the first model to undertake regression using Minitab (Ver. 15). In
Regressions for total hours of breakdown services and total hours of preventative maintenance services from the first model.
When the TPM is less than 12000 hours (PM services intervals for the old straddles = 2500 hours), we observe that TEM decreases with increasing values for TPM. At the same time, when the TPM is greater than 16 000 hours (PM services time intervals for the old straddles = 1300 hours), TEM also decreases with the increasing TPM values. Hence, when PM services intervals are less than 1300 hours, TEM decreases with the shorter intervals; when PM services intervals are greater than 2500 hours, TEM increases with increasing intervals. As
In summary, for the reliability estimation (against changes in PM intervals), we find that (1) simulation models perform better when focusing on individual straddles, (2) impacts of PM intervals on straddle fleet reliability are limited, (3) there appears to be no relationship between TEM and TPM and (4) the optimal decision intervals for PM services are between 1000 hours and 1300 hours and between 2500 hours and 3000 hours.
Having developed simulation models and forecast fleet reliability against different PM service intervals, here we evaluate the current performances of straddles in the case organisation. In
Index values for the first model: Results of main indices.
Index | Performances |
Reliability | 94.3% |
TOC | 303 693.3 hours |
TPM | 20 500.53 hours |
TEM | 19 453.38 hours |
TCM | 14 991.16 hours |
Utilisation of whole fleet | 69% |
Utilisation of PM team | 66% |
Utilisation of contractor team | 96% |
Utilisation of REM and BD team | 47% |
Average queuing time for BD services | 0.058 hours |
Containers in the queue | 131 408 |
Delay PM services | 339 |
TOC, total hours of lifting work; TPM, total hours of preventative maintenance services; TEM, total hours of breakdown services, TCM, total hours of remedial services; PM, preventative maintenance; BD, breakdown.
Routine policies for work centres.
Work centre | Routine policies |
PM Arrival WCs | Circulate |
Dummy WC for REM | Shortest queue |
Dummy WC for BD | Circulate |
Dummy WC for lifting | 26% for new lifting WCs; 74% for old lifting WCs |
PM, preventative maintenance; WC, work centres; REM, remedial; BD, breakdown.
In terms of the different scenarios, we show that changes solely in PM service intervals are only likely to increase reliability by 0.5%. If we set PM service intervals to 1800 hours and add two extra technicians to the PM team, as shown in
Scenarios for preventative maintenance service changes: Changes caused by adding two preventative maintenance technicians.
Index | Performances |
Reliability | 93.6% |
TOC | 270 880.3 hours |
TPM | 22 542.73 hours |
Utilisation of PM team | 70% |
Containers in the queue | 25 571 |
Delay PM services | 72 |
Description | Labour resources |
PM repair team: Day shift | 10 |
PM repair team: Night shift | 10 |
Distributions for PM team | [1,2] For 1 PM WC, [2,2] For 2 PM WCs, [2,4] For 2 PM WCs |
TOC, total hours of lifting work; TPM, total hours of preventative maintenance services; PM, preventative maintenance; WC, work centre.
Shorter shifts for preventative maintenance technicians.
Index | Performances |
Reliability | 93% |
TOC | 272 779.6 hours |
TPM | 178 364.87 hours |
Utilisation of PM team | 100% |
Containers in the queue | 82 963 |
Delay PM services | 366 |
TOC, total hours of lifting work; TPM, total hours of preventative maintenance services; PM, preventative maintenance.
Outcomes of longer shifts for preventative maintenance technicians.
Index | Performances |
Reliability | 93.5% |
TOC | 213 404.5 hours |
TPM | 24 279.61 hours |
Utilisation of PM team | 72% |
Containers in the queue | 192 670 |
Delay PM services | 204 |
TOC, total hours of lifting work; TPM, total hours of preventative maintenance services; PM, preventative maintenance.
Outcomes for adding two new straddles in lifting system.
Index | Performances |
Reliability | 94.5% |
TOC | 319 688.6 hours |
TPM | 21 283.87 hours |
Utilisation of whole fleet | 70% |
Utilisation of PM team | 72% |
Containers in the queue | 73 328 |
TOC, total hours of lifting work; TPM, total hours of preventative maintenance services; PM, preventative maintenance.
Outcomes for increasing proportion of new lifting work centres.
Index | Performances |
Reliability | 94.1% |
TOC | 290 965 hours |
TPM | 22 589.35 hours |
Utilisation of whole fleet | 71% |
Utilisation of PM team | 86% |
Containers in the queue | 88 764 |
TOC, total hours of lifting work; TPM, total hours of preventative maintenance services; PM, preventative maintenance.
Based on the above, we propose two generalised models developed utilising MS Excel. These focus on: (1) decisions at operational level (strategy one) and (2) decisions at a strategic level (strategy two). An increase in the number of PM technicians is needed to reduce service cycles, which in turn reduces the number of hours that straddles will occupy the PM work centres. For strategy one the decision had been to: (1) retain the current situation for both repairing and lifting systems, (2) focus on individual straddle performance and (3) operate available straddles based on optimal portfolios. An interface for this scenario was constructed/built in MS Excel. Data were collected from different batches of straddles, with key indices of TEM, TOC, TPM and TCM, and the reliability for each group estimated using equation (6):
In the MS Excel interface the reliability of the straddle fleet will change against different numbers of straddles. For instance, if five 3H and five 4H straddles are required for lifting containers, when five new straddles from group 10 and group 12 are chosen, the reliability of the straddle fleet is 96.89% (see
Reliability for applying only new straddles.
The second strategy represents decisions taken at a strategic level where: (1) there are two new straddles in the lifting system and (2) there is an increase in the number of PM technicians to ten for each shift. In
Outcomes for strategy two.
Index | Performances |
Reliability | 94.70% |
TOC | 318 147.08 hours |
TPM | 24 595.26 hours |
TEM | 19 318.86 hours |
TCM | 14 991.83 hours |
Utilisation of whole fleet | 72% |
Utilisation of PM team | 66% |
Containers in the queue | 0 |
Delayed PM services | 207 |
TOC, total hours of lifting work; TPM, total hours of preventative maintenance services; TEM, total hours of breakdown services, TCM, total hours of remedial services; PM, preventative maintenance.
In future, however, it will be necessary to classify BD services in more detail, and to rank the emergency and critical levels for each BD service work order. After that, inter-arrival time for machinery BD services must be applied in simulation models and a contrast drawn with outcomes from this study. In the current maintenance regime of the case organisation the PM services obey the ‘first come, first served’ principle; however, because both reliability and availability of straddles differ, it is necessary to build models for solving issues around the scheduling of maintenance services.
Heuristic techniques and deterministic operational research approaches are useful for future models on prioritising certain straddles, and for ensuring that all PM are completed during the maintenance team shifts. Furthermore, as straddles are the main handling equipment in the case organisation, the logistics of containers are essential considerations when evaluating straddle fleets. With reduction in unproductive moves and empty travel time, the productivity of loading and unloading systems can be expected to reflect positively in academic evaluations of carriers.
Since the working and repairing processes of straddles are full of uncertainty, variability and complexity, a number of factors would affect the reliability of the straddle fleet and predictions of BD services. For this study only PM service intervals are considered; we do, however, suggest that more exhaustive efforts are needed to map out all of the variables that, taken together, can be said to comprise straddle agility and resilience. How maintenance regimes affect straddle resilience and agility certainly merits further study.
Following slight improvements in the global economic environment, the largest container terminal operators are experiencing increasing demand for cargo handling. Operators generally have a number of options in responding to increasing demand for their services. One is to enhance their competitive standing by promoting higher productivity. This strategy requires a high level of reliability in container handling. However, managers face the reality that their handling equipment stocks continue to age and may need replacing. As such, this study identifies two major factors of concern to managers, relating to how changes in maintenance intervals may impact on reliability and how to evaluate performance in order to achieve higher rates of reliability.
This study, that seeks to examine the reliability of equipment and the possible impact of preventative intervals on maintenance programmes, serves as an important means of informing major customers and stakeholders on how equipment maintenance may be optimised. The study is of particular relevance to managers as it represents a collaborative endeavour between academia and industry.
For this project original data about BD services may reflect both human factors and machinery defaults. In future it will be necessary to classify BD services in more detail and to rank the emergency and critical levels for each BD service work order. After that, inter-arrival time for machinery BD services must be applied in simulation models and a contrast drawn with outcomes obtained from this study.
In the current maintenance regime of organisation A the PM services obey the ‘first come, first served’ principle. However, because both reliability and availability of straddles differ, it is necessary to build models for solving the scheduling of maintenance services issues. Heuristic techniques and deterministic operational research approaches are useful for future models on prioritising certain straddles and ensuring that all PM services are completed during the maintenance team shifts. Furthermore, as straddles are the main type of handling equipment in organisation A, logistics of containers are essential for a straddle fleet. A reduction in unproductive moves and empty travel time will increase the productivity of the loading and unloading systems.
In the general simulation model the assumption has been made that work efficiency for straddles and labour resources is 100% and that the inspections in the repair system are perfect. In fact, due to the fact that straddles are a type of manual handling equipment, working efficiencies in real operations are usually less than 100%. Also, inspections for straddles are not perfect, because of technological restrictions.
The authors declare that they have no financial or personal relationships which may have inappropriately influenced them in writing this article.
S.L. (University of Southampton), T.H. (APM Terminals AME), Y.W. (University of Southampton), U.O. (British University in Dubai), and A.M. (University of Southampton) all made equal conceptual contributions that led to the development of this article.